In this paper, by mixed finite element analysis (the basic varies being the displacement and the pressure), rubber strain energy functions always are used according to Penns invariant decompressions, using the methods in paper[3], The plane strain rubber large deformation is calculated, a series of problems are overcome.

おhe partially invariant solutions of the variablecoefficient nonlinear Schrdinger equations with fourdimensional symmetry algebras are obtained.

The existence of partially invariant solutions of the wave equations which arises from in homogeneous medium is considered.

Using a Bcklund transformation and the variable separation technique, we find the variable separation solution of the (2+1) dimensional Burgers equations by the entrance of there arbitrary functions (one condition function) for the seed solution.

Applying the extended homogeneous balance method, the variable separation solution with two arbitrary functions to the three-dimensional generalized Burgers equation is obtained.